Course
Code : 0502407
Course
Name
: Mathematic for Engineers II
Instructor
: Lec. Abdullah Bakır
Theoretical/ Practical/Credit
: 4
/ 0/ 4
|
Learning Activity |
Estimated Time(Hour) |
Evaluation |
|
Theoretical Course (14 Week) |
3 x 14 = 42 |
Participation to class |
|
Guided Problem Solving |
2 x 14 = 28 |
Active Participation |
|
Individual Study |
3 x 14 = 42 |
|
|
Weekly homework problems be solved |
1 x 14 = 14 |
Individual or teamwork and
report preparation for homework’s. |
|
Term project |
None |
|
|
Midterm Exams |
4 x 2 = 8 |
Closed Book |
|
Final Exam |
For Exam
: 2 Individual Study: 8 |
Closed Book |
|
Quiz (4 Piece) |
Individual Study: 8 |
Closed Book |
|
Research (internet / library) |
|
|
|
Other (documentary / movie watching) |
|
|
|
Other (conference, panel, etc.. Attend meetings) |
|
|
|
Total Course Load (Hours) |
152 |
|
|
Code of Course & Name |
: |
0502407 Mathematic for
Engineers II |
|
Type of Course |
: |
Compulsory |
|
Prerequisite/Recommended |
: |
None |
|
Year/Semester |
: |
2st Year / Spring Semester |
|
Credit |
: |
4 |
|
coordinate of course |
: |
Lec Abdullah Bakır |
|
Division/Department/Program |
: |
Mechanical Engineering
/Licence |
|
Instructor |
: |
Lec Abdullah Bakır |
|
Room/Number classroom |
: |
M.M. 2 |
|
Time of course |
: |
13:00-16:30 |
|
Meeting time |
: |
10:00-12:00 |
|
Groups |
: |
One group |
|
Objective of the Course |
: |
This course is to teach basic differential and
to Show the application of these equations to various engineering
problems |
|
Course Contents |
: |
Differential equations. Existence and uniqueness of solutions. First
order differential equations. Applications of first-order differential
equations. Second-order differential equations with constant coefficients.
Use of operator method in solving the nth-order linear differential equations
with constant coefficient. Cauchy and Legendre equations. Laplace
transformations. Power series solutions of differential equations.
Introduction to partial differential equations. |
|
Textbook/Recommended Reading |
: |
1.
Hilmi HACISALİHOĞLU, “Temel
ve Genel Matematik”, 1990. 2.
Boyce W.E, and DiPrima R.C.,
“Elementary Differantial Equations” 7th edition, John Wiley and
Sons, New-York, 2001. R.C. 3.
Thomas G.B., Finey R.L.,
“Calculus and Analytic Geometry”, Part 2, 8th edition,
Addison-Wesley, New-York, 1992. 4.
Hughers H., Gleason M., at
al. “ Single and Multivariable Calculus” John Wiley, 3rd edition,
New-York, 2002. 5.
Johnston E.H. and Mathews
J.C..“Calculus”, Addison Wesley, New-York, 2002. 6.
Prof. Dr. Gabil ALİYEV,
1995, “Kısmi Türevli Diferansiyel Denklemler”, Milli Eğitim Basımevi |
|
Semester Teaching Plan |
1. Differential equations. Existence and
uniqueness of solutions 2. Gauss, Gren ve Stokes formula 3. General definition at the differential
equations 4. First order differential equations 5. Second-order differential equations with
constant coefficients 6. General again 7. Midterm exam 8. Use of operator method in solving the
nth-order linear differential equations with constant coefficient 9. Use of operator method in solving the nth-order linear differential
equations with constant coefficient 10. General again 11. General again 12. General again 13. Power series solutions of differential equations.
Introduction to partial differential equations. 14. General again |
|
|
Form of Assessment |
One written midterm exam
(40% ); one written final exam (60%) |
|